Representability of permutation representations on coalgebras and the isomorphism problem

Abstract

Let G be a group and let GSym(V) be a permutation representation of G on a set V. We prove that there is a faithful G-coalgebra C such that G arises as the image of the restriction of Aut(C) to G(C), the set of grouplike elements of C. Furthermore, we show that V can be regarded as a subset of G(C) invariant through the G-action, and that the composition of the inclusion GAut(C) with the restriction Aut(C)Sym(V) is precisely . We use these results to prove that isomorphism classes of certain families of groups can be distinguished through the coalgebras on which they act faithfully.